Editing Continuum hypothesis (section)

==Further reading==
* {{Cite book |last=Cohen |first=Paul Joseph |author-link=Paul Cohen (mathematician) |date=2008 |orig-date=1966 |title=Set theory and the continuum hypothesis |location=Mineola, New York City |publisher=Dover Publications |isbn=978-0-486-46921-8
 }}
* {{Cite book |last1=Dales |first1=H.G. |last2=Woodin |first2=W.H. |date= 1987 |title=An Introduction to Independence for Analysts |publisher=Cambridge 
}}
* {{Cite book |last=Enderton |first=Herbert |date=1977 |title=Elements of Set Theory |publisher=Academic Press
 }}
* Gödel, K.: ''What is Cantor's Continuum Problem?'', reprinted in Benacerraf and Putnam's collection ''Philosophy of Mathematics'', 2nd ed., Cambridge University Press, 1983. An outline of Gödel's arguments against CH.
* Martin, D. (1976). "Hilbert's first problem: the continuum hypothesis," in ''Mathematical Developments Arising from Hilbert's Problems,'' Proceedings of Symposia in Pure Mathematics XXVIII, F. Browder, editor. American Mathematical Society, 1976, pp.&nbsp;81–92. {{ISBN|0-8218-1428-1}}
* {{Cite web |author=McGough, Nancy |title=The Continuum Hypothesis |url=http://www.ii.com/math/ch/ }}
*  {{Cite web |author=Wolchover, Natalie |title=How Many Numbers Exist? Infinity Proof Moves Math Closer to an Answer |date=15 July 2021 |url=https://www.quantamagazine.org/how-many-numbers-exist-infinity-proof-moves-math-closer-to-an-answer-20210715/ }}